In this paper, we study Zermelo navigation on Riemannian manifolds and use that to solve a long standing problem in Finsler geometry, namely the complete classification of strongly convex Randers metrics of constant flag curvature.

/pdf/zermelo-navigation-on-riemannian-manifolds-8fxf7b1k4f.pdf

Zermelo navigation on Riemannian manifolds

Riemann–Finsler geometry and Lorentz-violating kinematics

On the pseudo-conformal geometry of hypersurfaces of the space of n complex variables

The main purpose of developing stability theory is to examine dynamic responses of a system to disturbances as the time approaches infinity. It has been and still is the object of intense investigations due to its intrinsic interest and its relevance to all practical systems in engineering, finance, natural science and social science. This monograph provides some state-of-the-art expositions of major advances in fundamental stability theories and methods for dynamic systems of ODE and DDE types and in limit cycle, normal form and Hopf bifurcation control of nonlinear dynamic systems. Presents comprehensive theory and methodology of stability analysis Can be used as textbook for graduate students in applied mathematics, mechanics, control theory, theoretical physics, mathematical biology, information theory, scientific computation Serves as a comprehensive handbook of stability theory for practicing aerospace, control, mechanical, structural, naval and civil engineers

Stability of dynamical systems

Introduction 198 1. Flag and Ricci Curvatures 199 1.1. Finsler metrics 199 1.2. Flag curvature 207 1.3. Ricci curvature 214 2. Randers Metrics in Their Defining Form 218 2.1. Basics 218 2.2. Characterising Einstein–Randers metrics 220 2.3. Characterising constant flag curvature Randers metrics 228 3. Randers Metrics Through Zermelo Navigation 230 3.1. Zermelo navigation 230 3.2. Navigation description of curvature conditions 236 3.3. Issues resolved by the navigation description 241 4. Einstein Metrics of Nonconstant Flag Curvature 244 4.1. Examples with Riemannian–Einstein navigation data 244 4.2. Examples with Kähler–Einstein navigation data 247 4.3. Rigidity and a Ricci-flat example 251 5. Open Problems 254 5.1. Randers and beyond 254 5.2. Chern’s question 255 5.3. Geometric flows 256 Acknowledgments 256 References 256

Ricci and Flag Curvatures in Finsler Geometry

Geometry of Distributions on a Manifold.- Structural and Transversal Geometry of Foliations.- Foliations on Semi-Riemannian Manifolds.- Parallel Foliations.- Foliations Induced by Geometric Structures.- A Gauge Theory on a Vector Bundle.

Foliations and Geometric Structures

, u both decompositions beingconsidered with respect to the quaternion structure of the ambient manifold. Taking intoaccount the research done till now, we may conclude that quaternion CR-submanifoldsand Qii-submanifolds have very little in common, and that there is much room for newresults on their geometry.According to a result of Bejancu (see [3, Theorem 3.3]), any totally umbilical properQii-submanifold M of a quaternion Kaehlerian manifol

/pdf/on-totally-umbilical-qr-submanifolds-of-quaternion-22peq58lbz.pdf

On totally umbilical QR-submanifolds of quaternion Kaehlerian manifolds

Let (M¯,g¯) be a 5D warped space defined by the 4D spacetime (M, g) and the warped function A. By using the extrinsic curvature of the horizontal distribution, we obtain the classification of all spaces (M¯,g¯) satisfying Einstein equations G¯=−λ¯g¯. This enables us to describe all the exact solutions for the warped metric g¯ by means of 4D exact solutions.

Classification of 5d warped spaces with cosmological constant

We prove that a Finsler manifold F m is of constant curvature K = 1 if and only if the unit horizontal Liouville vector field is a Killing vector field on the indicatrix bundle IM of F m .

/pdf/a-geometric-characterization-of-finsler-manifolds-of-l14j101qhv.pdf

A geometric characterization of finsler manifolds of constant curvature k = 1

A concept of folding for compact connected surfaces, involving the partition of the surface into combinatorially identical n-sided topological polygons, is defined. The existence of such foldings for given n and given surfaces is explored, with definitive results for the sphere and the torus. We obtain necessary conditions for the existence of such foldings in all other cases.

Folding a surface to a polygon

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